Solve the problem.[1-3 27Let A =-2 5-13-4 2and b =b3Determine if the equation Ax = b is consistent for all possible by, ba, b. If the equation is not consistent for all possible b₁ b₂b3, give a description of the set of all b for which the equation is consistent (i.e., a condition which must be satisfied by by, by bO Equation is consistent for all possible b₁,b₂, b3.O Equation is consistent for all b₁,b2, b3 satisfying -3b₁-03-0O Equation is consistent for all b₁ b2. ba satisfying 2b1 +2 +0.11O Equation is consistent for all b₁,b₂, b3 satisfying 7b+ 5b3-ba-10.

Answered: Image /qna-images/answer/6344f622-0d16-453e-a865-41ff824ba05d.jpg

Answered: bi 1-3 2 b2 and b -2 5-1 Let A 3-4 2 b3…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Philosophical Logic
-5 [h -21 Let aj = az = and az = -9 3 -4 The set {a, a2, az} will span R unless h = (If there are no values of h that make the set fail to span, enter "NONE". If the set fails to span for all values of h enter "ALL".)
Determine if the equation Ax=b is consistent for all possible b₁,b₂, and b3. If the equation is not consistent for all possible b₁,b₂, b3, give 1 a description of the set of all b for which the equation is consistent (that is, a condition which must be satisfied by b₁,b₂, and b3). 1 - 3 2 43-8 Let A = -2 5 1 and b = b₂ b₁ b3 O A. Equation is consistent for all b₁,b2, and b3 satisfying -3b₁ + b3 = 0. O B. Equation is consistent for all b₁,b₂, and b3 satisfying 2b₁ + b₂ = 0. O C. Equation is consistent for all possible b₁,b₂, and b3. O D. Equation is consistent for all b₁,b2, and b3 satisfying 7b₁ + 5b₂ + b3 = 0.
The symmetric equation of the line that passes through the points A(1, 2, 3) and B(4, 6, 8) is: Select one: O None of these O x O x O x O x - 3 1 5 4 - 4 1 1 1 1 x 2 X X x - 4 1 4 - 6 - 5 ст 2 2 2 || x 8 X X - 5 เว - 3 - 8 - 3 3 3 3 3
The set of circles centred at the point (-2, 3). More generally, given a fixed point (a, b), what is the equation of the first order ODE representing the set of circles centred at that point?
Plz give proper explanation and give correct solution.
i need complete solution step by step
O Find the solution of recuxkence relation -39n-2- 9. =-39. n-3 9=1,9=-2 O Find the solution of reccurrene relation an= 119-399, +454 1-4 0=5,9=11 z=25
We throw a symmetrical dice twice. Let X denote the number of throws in which an odd number of dice fell, and let Y denote the remainder of the product of the dice's rolls divided by 3.Check whether the variables X and Y are (a) independent (b) uncorrelated

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